Related papers: Quantum Error Correction Exploiting Degeneracy to Approach the Hashing Bound

Quantum Error Correction Exploiting Degeneracy to Approach the Hashing Bound

URL: http://arxiv.org/abs/2506.15636v1
Date: Wed, 18 Jun 2025 17:07:04 GMT
Title: Quantum Error Correction Exploiting Degeneracy to Approach the Hashing Bound
Authors: Kenta Kasai,
Abstract summary: We show that explicitly exploiting the degeneracy of quantum errors can significantly enhance the decoding performance.<n>The proposed method achieves a frame error rate as low as $10-4$ at a physical error rate of 9.45% for a code with 104,000 logical qubits and 312,000 physical qubits.
Score: 0.0
License: http://creativecommons.org/licenses/by/4.0/
Abstract: Quantum error correction is essential for realizing scalable quantum computation. Among various approaches, low-density parity-check codes over higher-order Galois fields have shown promising performance due to their structured sparsity and compatibility with iterative decoding algorithms whose computational complexity scales linearly with the number of physical qubits. In this work, we demonstrate that explicitly exploiting the degeneracy of quantum errors can significantly enhance the decoding performance. Simulation results over the depolarizing channel indicate that the proposed method, at a coding rate of 1/3, achieves a frame error rate as low as $10^{-4}$ at a physical error rate of 9.45% for a code with 104,000 logical qubits and 312,000 physical qubits, approaching the quantum hashing bound. These findings highlight the critical role of degeneracy in closing the gap to the fundamental limits of quantum error correction.

Related papers

Quantum Error Correction near the Coding Theoretical Bound [0.0]
We present quantum error-correcting codes constructed from classical LDPC codes.<n>These codes approach the hashing bound while maintaining linear computational complexity in the number of physical qubits.<n>This result establishes a pathway toward realizing large-scale, fault-tolerant quantum computers.
arXiv Detail & Related papers (2024-12-30T18:48:54Z)
Demonstration of logical qubits and repeated error correction with better-than-physical error rates [0.0]
We present experiments on a trapped-ion QCCD processor where, through the use of fault-tolerant encoding and error correction, we are able to suppress logical error rates to levels below the physical error rates. Results signify a transition from noisy intermediate scale quantum computing to reliable quantum computing, and demonstrate advanced capabilities toward large-scale fault-tolerant quantum computing.
arXiv Detail & Related papers (2024-04-02T20:14:13Z)
Fast Flux-Activated Leakage Reduction for Superconducting Quantum Circuits [84.60542868688235]
leakage out of the computational subspace arising from the multi-level structure of qubit implementations. We present a resource-efficient universal leakage reduction unit for superconducting qubits using parametric flux modulation. We demonstrate that using the leakage reduction unit in repeated weight-two stabilizer measurements reduces the total number of detected errors in a scalable fashion.
arXiv Detail & Related papers (2023-09-13T16:21:32Z)
Near-Term Distributed Quantum Computation using Mean-Field Corrections and Auxiliary Qubits [77.04894470683776]
We propose near-term distributed quantum computing that involve limited information transfer and conservative entanglement production. We build upon these concepts to produce an approximate circuit-cutting technique for the fragmented pre-training of variational quantum algorithms.
arXiv Detail & Related papers (2023-09-11T18:00:00Z)
Compilation of a simple chemistry application to quantum error correction primitives [44.99833362998488]
We estimate the resources required to fault-tolerantly perform quantum phase estimation on a minimal chemical example. We find that implementing even a simple chemistry circuit requires 1,000 qubits and 2,300 quantum error correction rounds.
arXiv Detail & Related papers (2023-07-06T18:00:10Z)
Deep Quantum Error Correction [73.54643419792453]
Quantum error correction codes (QECC) are a key component for realizing the potential of quantum computing. In this work, we efficiently train novel emphend-to-end deep quantum error decoders. The proposed method demonstrates the power of neural decoders for QECC by achieving state-of-the-art accuracy.
arXiv Detail & Related papers (2023-01-27T08:16:26Z)
Low-overhead quantum error correction codes with a cyclic topology [0.0]
We show an approach to construct the quantum circuit of a correction code with ancillas entangled with non-neighboring data qubits.<n>We introduce a neural network-based decoding algorithm supported by an improved lookup table decoder.
arXiv Detail & Related papers (2022-11-06T12:22:23Z)
Suppressing quantum errors by scaling a surface code logical qubit [147.2624260358795]
We report the measurement of logical qubit performance scaling across multiple code sizes. Our system of superconducting qubits has sufficient performance to overcome the additional errors from increasing qubit number. Results mark the first experimental demonstration where quantum error correction begins to improve performance with increasing qubit number.
arXiv Detail & Related papers (2022-07-13T18:00:02Z)
Quantum Error Correction with Quantum Autoencoders [0.0]
We show how quantum neural networks can be trained to learn optimal strategies for active detection and correction of errors. We highlight that the denoising capabilities of quantum autoencoders are not limited to the protection of specific states but extend to the entire logical codespace.
arXiv Detail & Related papers (2022-02-01T16:55:14Z)
Erasure conversion for fault-tolerant quantum computing in alkaline earth Rydberg atom arrays [3.575043595126111]
We propose a qubit encoding and gate protocol for $171$Yb neutral atom qubits that converts the dominant physical errors into erasures. We estimate that 98% of errors can be converted into erasures.
arXiv Detail & Related papers (2022-01-10T18:56:31Z)
Realizing Repeated Quantum Error Correction in a Distance-Three Surface Code [42.394110572265376]
We demonstrate quantum error correction using the surface code, which is known for its exceptionally high tolerance to errors. In an error correction cycle taking only $1.1,mu$s, we demonstrate the preservation of four cardinal states of the logical qubit.
arXiv Detail & Related papers (2021-12-07T13:58:44Z)
Exponential suppression of bit or phase flip errors with repetitive error correction [56.362599585843085]
State-of-the-art quantum platforms typically have physical error rates near $10-3$. Quantum error correction (QEC) promises to bridge this divide by distributing quantum logical information across many physical qubits. We implement 1D repetition codes embedded in a 2D grid of superconducting qubits which demonstrate exponential suppression of bit or phase-flip errors.
arXiv Detail & Related papers (2021-02-11T17:11:20Z)
Deterministic correction of qubit loss [48.43720700248091]
Loss of qubits poses one of the fundamental obstacles towards large-scale and fault-tolerant quantum information processors. We experimentally demonstrate the implementation of a full cycle of qubit loss detection and correction on a minimal instance of a topological surface code.
arXiv Detail & Related papers (2020-02-21T19:48:53Z)

This list is automatically generated from the titles and abstracts of the papers in this site.